Answer:
2.8%
Explanation:
The formula to calculate value of a perpetuity is as follow:
V = Annuity payment in year 1 / (r-g)
V: Value of the perpetuity
r: Discount rate
g: Growth rate (missing value)
By inputting numbers into the formula, we have:
6225.81 = 386 / (0.09 - g)
--> g = 2.8%
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Answer:
The rate that will give the same effective annual rate of return is 0.033%.
Explanation:
a) Data and Calculations:
APR = 12%
Semi-annual compound rate = 6% (12/2)
Assumed calendar days in a year = 360 days
Effective daily rate of return = 12%/360 = 0.033%
b) The conversion of semi-annual compounding to daily compounding results in reduced rate of return. In this case, we assume that there are 360 days in a year. Since the APR = 12%, it means that the daily rate of return will be 12%/360, which is 0.033%.
Answer:
Option (b) is correct.
Explanation:
The Journal entries are as follows:
(i) On November 1, 2015
Retained Earnings [$3 × 20,000] A/c Dr. $60,000
To Dividend Payable $60,000
(To record the declaration of dividend)
(ii) On November 30, 2015
Dividend Payable A/c Dr. $60,000
To cash A/c $60,000
(To record the payment of dividend)
Answer:
50,000
Explanation:
Hughes Corporation can calculate the incremental cash outflow required to acquire the new machine by just deducting the sales proceeds from the cost of the new machine.
DATA
New machine = $150,000
Old machine = 100,000
Cash outflow per year (18,000 - 10,000) = 8,000
Salvage value = 25,000
Annuity factor = 8%
Solution
Incremental Cash outflow = Cost of new machine - Sales proceeds from old machine
Incrementa Cash outflow = 150,000 - 100,000
Incremental Cash outflow = $50,000